Nirenberg problem on high dimensional spheres: Blow up with residual mass phenomenon

TL;DR

This paper analyzes blow-up phenomena in high-dimensional spheres for the Nirenberg problem, focusing on solutions with residual mass and their topological implications, extending previous subcritical approximation studies.

Contribution

It provides a detailed description of blow-up solutions with non-zero weak limits, including blow-up points, rates, and topological contributions, advancing understanding of the Nirenberg problem.

Findings

Characterization of blow-up points and rates

Topological impact of blow-up solutions

Construction of solutions with non-degenerate weak limits

Abstract

In this paper, we extend the analysis of the subcritical approximation of the Nirenberg problem on spheres recently conducted in \cite{MM19, MM}. Specifically, we delve into the scenario where the sequence of blowing up solutions exhibits a non-zero weak limit, which necessarily constitutes a solution of the Nirenberg problem itself. Our focus lies in providing a comprehensive description of such blowing up solutions, including precise determinations of blow-up points and blow-up rates. Additionally, we compute the topological contribution of these solutions to the difference in topology between the level sets of the associated Euler-Lagrange functional. Such an analysis is intricate due to the potential degeneracy of the involved solutions. We also provide a partial converse, wherein we construct blowing up solutions when the weak limit is non-degenerate.